Exponential splitting for nonautonomous linear discrete-time systems in Banach spaces

被引:4
|
作者
Megan, Mihail [1 ,2 ]
Popa, Ioan-Lucian [3 ]
机构
[1] Acad Romanian Scientists, Independentei 54, Bucharest 050094, Romania
[2] West Univ Timisoara, Fac Math & Comp Sci, Dept Math, V Parvan Blv 4, Timisoara 300223, Romania
[3] 1 Decembrie 1918 Univ Alba Iulia, Fac Exact Sci & Engn, Dept Math, Alba Iulia 510009, Romania
来源
JOURNAL OF COMPUTATIONAL AND APPLIED MATHEMATICS | 2017年 / 312卷
关键词
Nonautonomous linear discrete-time systems; Exponential splitting; Strong exponential splitting; LYAPUNOV SEQUENCES; DICHOTOMY; CRITERIA;
D O I
10.1016/j.cam.2016.03.036
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper we consider some concepts of exponential splitting for nonautonomous linear discrete-time systems. These concepts are generalizations of some well-known concepts of (uniform and nonuniform) exponential dichotomies. Connections between these concepts are presented and some illustrating examples prove that these are distinct. (C) 2016 Elsevier B.V. All rights reserved.
引用
收藏
页码:181 / 191
页数:11
相关论文
共 50 条
  • [1] EXPONENTIAL DICHOTOMIES FOR LINEAR DISCRETE-TIME SYSTEMS IN BANACH SPACES
    Popa, Ioan-Lucian
    Megan, Mihail
    Ceausu, Traian
    APPLICABLE ANALYSIS AND DISCRETE MATHEMATICS, 2012, 6 (01) : 140 - 155
  • [2] On exponential stability for linear discrete-time systems in Banach spaces
    Popa, Ioan-Lucian
    Ceausu, Traian
    Megan, Mihail
    COMPUTERS & MATHEMATICS WITH APPLICATIONS, 2012, 63 (11) : 1497 - 1503
  • [3] Nonuniform Exponential Trichotomy for Linear Discrete-Time Systems in Banach Spaces
    Song, Xiao-qiu
    Yue, Tian
    Li, Dong-qing
    JOURNAL OF FUNCTION SPACES AND APPLICATIONS, 2013,
  • [4] On Polynomial Dichotomy of Linear Discrete-Time Systems in Banach Spaces
    Tian YUE
    Guoliang LEI
    JournalofMathematicalResearchwithApplications, 2015, 35 (05) : 543 - 550
  • [5] On Nonuniform Polynomial Trichotomy of Linear Discrete-Time Systems in Banach Spaces
    Li, Zhi-gang
    Song, Xiao-qiu
    Yang, Xiu-li
    JOURNAL OF APPLIED MATHEMATICS, 2014,
  • [6] Nonuniform Polynomial Dichotomy for Noninvertible Linear Discrete-Time Systems in Banach Spaces
    Yue, Tian
    JOURNAL OF CONTROL SCIENCE AND ENGINEERING, 2015, 2015
  • [7] On Uniform Dichotomies for the Growth Rates of Linear Discrete-time Dynamical Systems in Banach Spaces
    Boruga , Rovana
    DIFFERENCE EQUATIONS, DISCRETE DYNAMICAL SYSTEMS AND APPLICATIONS, IDCEA 2022, 2024, 444 : 175 - 188
  • [8] Exponential stabilization of discrete-time switched linear systems
    Zhang, Wei
    Abate, Alessandro
    Hu, Jianghai
    Vitus, Michael P.
    AUTOMATICA, 2009, 45 (11) : 2526 - 2536
  • [9] Discrete-Time Nonautonomous Dynamical Systems
    Kloeden, P. E.
    Poetzsche, C.
    Rasmussen, M.
    STABILITY AND BIFURCATION THEORY FOR NON-AUTONOMOUS DIFFERENTIAL EQUATIONS, CETRARO, ITALY 2011, 2013, 2065 : 35 - 102
  • [10] On the Robustness of a Concept of Dichotomy with Different Growth Rates for Linear Discrete-Time Systems in Banach Spaces
    Crai, Violeta
    2016 IEEE 11TH INTERNATIONAL SYMPOSIUM ON APPLIED COMPUTATIONAL INTELLIGENCE AND INFORMATICS (SACI), 2016, : 123 - 129
12345